Upper half-plane

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In mathematics, the upper half-plane, is the set of points in the Cartesian plane with The lower half-plane is the set of points with instead. Each is an example of two-dimensional half-space.

Affine geometry

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The affine transformations of the upper half-plane include

  1. shifts  ,  , and
  2. dilations  ,  

Proposition: Let   and   be semicircles in the upper half-plane with centers on the boundary. Then there is an affine mapping that takes   to  .

Proof: First shift the center of   to   Then take  

and dilate. Then shift   to the center of  

Inversive geometry

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Definition:  .

  can be recognized as the circle of radius   centered at   and as the polar plot of  

Proposition:     in   and   are collinear points.

In fact,   is the inversion of the line   in the unit circle. Indeed, the diagonal from   to   has squared length  , so that   is the reciprocal of that length.

Metric geometry

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The distance between any two points   and   in the upper half-plane can be consistently defined as follows: The perpendicular bisector of the segment from   to   either intersects the boundary or is parallel to it. In the latter case   and   lie on a ray perpendicular to the boundary and logarithmic measure can be used to define a distance that is invariant under dilation. In the former case   and   lie on a circle centered at the intersection of their perpendicular bisector and the boundary. By the above proposition this circle can be moved by affine motion to   Distances on   can be defined using the correspondence with points on   and logarithmic measure on this ray. In consequence, the upper half-plane becomes a metric space. The generic name of this metric space is the hyperbolic plane. In terms of the models of hyperbolic geometry, this model is frequently designated the Poincaré half-plane model.

Complex plane

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Mathematicians sometimes identify the Cartesian plane with the complex plane, and then the upper half-plane corresponds to the set of complex numbers with positive imaginary part:

 

The term arises from a common visualization of the complex number   as the point   in the plane endowed with Cartesian coordinates. When the   axis is oriented vertically, the "upper half-plane" corresponds to the region above the   axis and thus complex numbers for which  .

It is the domain of many functions of interest in complex analysis, especially modular forms. The lower half-plane, defined by   is equally good, but less used by convention. The open unit disk   (the set of all complex numbers of absolute value less than one) is equivalent by a conformal mapping to   (see "Poincaré metric"), meaning that it is usually possible to pass between   and  

It also plays an important role in hyperbolic geometry, where the Poincaré half-plane model provides a way of examining hyperbolic motions. The Poincaré metric provides a hyperbolic metric on the space.

The uniformization theorem for surfaces states that the upper half-plane is the universal covering space of surfaces with constant negative Gaussian curvature.

The closed upper half-plane is the union of the upper half-plane and the real axis. It is the closure of the upper half-plane.

Generalizations

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One natural generalization in differential geometry is hyperbolic  -space   the maximally symmetric, simply connected,  -dimensional Riemannian manifold with constant sectional curvature  . In this terminology, the upper half-plane is   since it has real dimension  

In number theory, the theory of Hilbert modular forms is concerned with the study of certain functions on the direct product   of   copies of the upper half-plane. Yet another space interesting to number theorists is the Siegel upper half-space   which is the domain of Siegel modular forms.

See also

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References

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  • Weisstein, Eric W. "Upper Half-Plane". MathWorld.